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The centre of the Dunkl total angular momentum algebra

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The centre of the Dunkl total angular momentum algebra. / Calvert, Kieran; Martino, Marcelo De; Oste, Roy.
Arxiv, 2022.

Research output: Working paperPreprint

Harvard

Calvert, K, Martino, MD & Oste, R 2022 'The centre of the Dunkl total angular momentum algebra' Arxiv. <https://arxiv.org/abs/2207.11185v1>

APA

Calvert, K., Martino, M. D., & Oste, R. (2022). The centre of the Dunkl total angular momentum algebra. Arxiv. https://arxiv.org/abs/2207.11185v1

Vancouver

Calvert K, Martino MD, Oste R. The centre of the Dunkl total angular momentum algebra. Arxiv. 2022 Jul 22.

Author

Calvert, Kieran ; Martino, Marcelo De ; Oste, Roy. / The centre of the Dunkl total angular momentum algebra. Arxiv, 2022.

Bibtex

@techreport{82150dc0a8284ef6ba38b42831c66ea1,
title = "The centre of the Dunkl total angular momentum algebra",
abstract = "For a finite dimensional representation $V$ of a finite reflection group $W$, we consider the rational Cherednik algebra $\mathsf{H}_{t,c}(V,W)$ associated with $(V,W)$ at the parameters $t\neq 0$ and $c$. The Dunkl total angular momentum algebra $O_{t,c}(V,W)$ arises as the centraliser algebra of the Lie superalgebra $\mathfrak{osp}(1|2)$ containing a Dunkl deformation of the Dirac operator, inside the tensor product of $\mathsf{H}_{t,c}(V,W)$ and the Clifford algebra generated by $V$. We show that, for every value of the parameter $c$, the centre of $O_{t,c}(V,W)$ is isomorphic to a univariate polynomial ring. Notably, the generator of the centre changes depending on whether or not $(-1)_V$ is an element of the group $W$. Using this description of the centre, and using the projection of the pseudo scalar from the Clifford algebra into $O_{t,c}(V,W)$, we establish results analogous to ``Vogan's conjecture'' for a family of operators depending on suitable elements of the double cover $\tilde{W}$. ",
keywords = "math.RT, 16S80, 17B10, 20F55, 81R12",
author = "Kieran Calvert and Martino, {Marcelo De} and Roy Oste",
year = "2022",
month = jul,
day = "22",
language = "English",
publisher = "Arxiv",
type = "WorkingPaper",
institution = "Arxiv",

}

RIS

TY - UNPB

T1 - The centre of the Dunkl total angular momentum algebra

AU - Calvert, Kieran

AU - Martino, Marcelo De

AU - Oste, Roy

PY - 2022/7/22

Y1 - 2022/7/22

N2 - For a finite dimensional representation $V$ of a finite reflection group $W$, we consider the rational Cherednik algebra $\mathsf{H}_{t,c}(V,W)$ associated with $(V,W)$ at the parameters $t\neq 0$ and $c$. The Dunkl total angular momentum algebra $O_{t,c}(V,W)$ arises as the centraliser algebra of the Lie superalgebra $\mathfrak{osp}(1|2)$ containing a Dunkl deformation of the Dirac operator, inside the tensor product of $\mathsf{H}_{t,c}(V,W)$ and the Clifford algebra generated by $V$. We show that, for every value of the parameter $c$, the centre of $O_{t,c}(V,W)$ is isomorphic to a univariate polynomial ring. Notably, the generator of the centre changes depending on whether or not $(-1)_V$ is an element of the group $W$. Using this description of the centre, and using the projection of the pseudo scalar from the Clifford algebra into $O_{t,c}(V,W)$, we establish results analogous to ``Vogan's conjecture'' for a family of operators depending on suitable elements of the double cover $\tilde{W}$.

AB - For a finite dimensional representation $V$ of a finite reflection group $W$, we consider the rational Cherednik algebra $\mathsf{H}_{t,c}(V,W)$ associated with $(V,W)$ at the parameters $t\neq 0$ and $c$. The Dunkl total angular momentum algebra $O_{t,c}(V,W)$ arises as the centraliser algebra of the Lie superalgebra $\mathfrak{osp}(1|2)$ containing a Dunkl deformation of the Dirac operator, inside the tensor product of $\mathsf{H}_{t,c}(V,W)$ and the Clifford algebra generated by $V$. We show that, for every value of the parameter $c$, the centre of $O_{t,c}(V,W)$ is isomorphic to a univariate polynomial ring. Notably, the generator of the centre changes depending on whether or not $(-1)_V$ is an element of the group $W$. Using this description of the centre, and using the projection of the pseudo scalar from the Clifford algebra into $O_{t,c}(V,W)$, we establish results analogous to ``Vogan's conjecture'' for a family of operators depending on suitable elements of the double cover $\tilde{W}$.

KW - math.RT

KW - 16S80, 17B10, 20F55, 81R12

M3 - Preprint

BT - The centre of the Dunkl total angular momentum algebra

PB - Arxiv

ER -